Locating-dominating coalitions in graphs

Abstract

A set D of vertices in a graph G = (V, E) is a locating-dominating set (LD-set) if it is dominating and every two vertices u, v of V D satisfy N(u) D ≠ N(v) D. Two disjoint sets A,B⊂ V(G) form a locating-dominating coalition (for short, an LD-coalition) in G if none of them is an LD-set in G but their union A B is an LD-set. A locating-dominating coalition partition (for short, an LDC-partition) is a vertex partition such that every set of is not an LD-set in G, but forms an LD-coalition with another set of . The locating-domination coalition number of G, denoted by CL(G), equals the maximum cardinality of an LDC-partition of G. Our purpose in this paper is to initiate the study of locating-dominating coalitions in graphs. We first investigate the existence of LDC-partitions. We also obtain lower and upper bounds on CL(G). We characterize connected graphs G of order n 3 satisfying CL(G) = n, as well as those trees T such that CL(T)=n-1. In addition, we determine the exact values of CL(G) for some classes of graphs. Moreover, we investigate the computational complexity of the decision problem associated with locating-dominating coalition partitions. To the best of our knowledge, this is the first work that addresses the algorithmic complexity of a decision problem related to coalition partitions, not only for this locating-dominating model but for coalition partitions in general.